**COURSE NOTES**

These are longer sets of notes, generally covering an entire course. Items marked "latexed" or "scanned" were converted from physical originals.

Differential Geometry (1972; 132 pp, 2.5 MB; latexed by Svetla Petkov)

https://uchicago.box.com/s/vabknygqmfkzngv44ru2st30ehpa5ozi

General Relativity (1972; 164 pp, 3.9 MB; latexed by Svetla Petkov)

https://uchicago.box.com/s/x4fi21zy1xnvja2j32vzlnjp7wo9802m

Geometrical Quantum Mechanics (1974; 72 pp, 0.6 MB; latexed by Rob
Salgado)

https://uchicago.box.com/s/lsj4uf3mqbv8fvnaml3hfx7femoftjt7

Quantum Field Theory (1971; 121 pp, 0.7 MB; latexed by Michael Seifert)

https://uchicago.box.com/s/yr273aa9qjel9j31bt7patiizv4m94wu

Unsolvable Problems (1990; 42 pp, 2.0 MB; latexed by Svetla Petkov)

Godel's theorem, for freshman nonscientists.
https://uchicago.box.com/s/v8mrcc8lqqe7ay0h8cha8lyfkp5624pm

Perspectives in Computation (2008; 163 pp, 0.9 MB)

https://uchicago.box.com/s/jj2trv94nl92z7zttem4k9fzjzaw3k0y

Infinite-Dimensional Manifolds (1975; 135 pp, 5.5 MB; latexed by
Svetla Petkov)

https://uchicago.box.com/s/wafekynldhtgj7rgoflme5ua41skeck7

Topology (1978; 176 pp, 14.4 MB; latexed by Svetla Petkov) An attempt,
not entirely successful, to teach "real topology" (the axioms for a
topological space) to freshman nonscientists.

https://uchicago.box.com/s/470ixhb8x0pv2luge12tjyqeu6zd9p0o

Integration Theory (1979; 95 pp, 48.6 MB, scanned) An attempt, also not
entirely successful, to formulate a general theory of measure/integration.

https://uchicago.box.com/s/wq4dif1cke9s945gji26uqsf8gidn998